Largest well-posed spaces for the general diffusion system with nonlocal interactions

Deng Chao; Liu Chun

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Largest well-posed spaces for the general diffusion system with nonlocal interactions

机译：具有非识别相互作用的总扩散系统的最大良好的空间

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摘要

The authors derive a general diffusion (GD) system with non local interactions of special structure via energetic variational approach and observe that there exist two critical values of s, i.e. s = 1/2, 1, for the nonlocal interactions, where s = 1/2 reflects how strong nonlocal property we have and s = 1 affects the linearization and choice of initial data spaces. The authors also establish the global existence and uniqueness of mild solution. (C) 2017 Elsevier Inc. All rights reserved.

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来源
《Journal of Functional Analysis》 |2017年第10期|共33页
作者
Deng Chao; Liu Chun;
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作者单位

Jiangsu Normal Univ Sch Math &

Stat Xuzhou 221116 Jiangsu Peoples R China;

Penn State Univ Dept Math University Pk PA 16802 USA;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
BMO-2s; Besov space; Well-posedness; Pseudodifferential calculus;

机译：BMO-2S;BESOV空间;良好的;假细胞微积分;

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Largest well-posed spaces for the general diffusion system with nonlocal interactions

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